On derivations and commutativity of prime rings with involution

被引:24
|
作者
Ali, Shakir [1 ]
Dar, Nadeem Ahmed [1 ]
Asci, Mustafa [2 ]
机构
[1] Aligarh Muslim Univ, Dept Math, Aligarh 202002, Uttar Pradesh, India
[2] Pamukkale Univ, Dept Math, TR-20100 Denizli, Turkey
来源
GEORGIAN MATHEMATICAL JOURNAL | 2016年 / 23卷 / 01期
关键词
Prime ring; normal ring; involution; derivation; SEMIPRIME; MAPPINGS;
D O I
10.1515/gmj-2015-0016
中图分类号
O1 [数学];
学科分类号
0701 ; 070101 ;
摘要
In [6], Bell and Daif proved that if R is a prime ring admitting a nonzero derivation such that d (xy) = d (yx) for all x, y is an element of R, then R is commutative. The objective of this paper is to examine similar problems when the ring R is equipped with involution. It is shown that if a prime ring R with involution * of a characteristic different from 2 admits a nonzero derivation d such that d (xx*) = d (x*x) for all x is an element of R and S(R) boolean AND Z(R) not equal (0), then R is commutative. Moreover, some related results have also been discussed.
引用
收藏
页码:9 / 14
页数:6
相关论文
共 50 条
  • [41] A characterization of b-generalized derivations on prime rings with involution
    Raza, Mohd Arif
    Khan, Abdul Nadim
    Alhazmi, Husain
    AIMS MATHEMATICS, 2022, 7 (02): : 2413 - 2426
  • [42] Identities related to generalized derivations in prime *- rings
    Boua, Abdelkarim
    Ashraf, Mohammed
    GEORGIAN MATHEMATICAL JOURNAL, 2021, 28 (02) : 193 - 205
  • [43] Generalised (α, β)-derivations in rings with involution
    Alhazmi, Husain
    Ali, Shakir
    Khan, Abdul N.
    MAEJO INTERNATIONAL JOURNAL OF SCIENCE AND TECHNOLOGY, 2020, 14 (01) : 68 - 80
  • [44] Herstein's theorem for prime ideals in rings with involution involving pair of derivations
    Khan, Mohammad Salahuddin
    Ali, Shakir
    Ayedh, Mohammed
    COMMUNICATIONS IN ALGEBRA, 2022, 50 (06) : 2592 - 2603
  • [45] Generalized derivations with skew-commutativity conditions on polynomials in prime rings
    Rania, Francesco
    BEITRAGE ZUR ALGEBRA UND GEOMETRIE-CONTRIBUTIONS TO ALGEBRA AND GEOMETRY, 2019, 60 (03): : 513 - 525
  • [46] Generalized derivations with skew-commutativity conditions on polynomials in prime rings
    Francesco Rania
    Beiträge zur Algebra und Geometrie / Contributions to Algebra and Geometry, 2019, 60 : 513 - 525
  • [47] ON STRONG COMMUTATIVITY PRESERVING LIKE MAPS IN RINGS WITH INVOLUTION
    Ali, Shakir
    Dar, Nadeem Ahmad
    Khan, Abdul Nadim
    MISKOLC MATHEMATICAL NOTES, 2015, 16 (01) : 17 - 24
  • [48] A study of differential prime rings with involution
    Oukhtite, Lahcen
    Zemzami, Omar Ait
    GEORGIAN MATHEMATICAL JOURNAL, 2021, 28 (01) : 133 - 139
  • [49] Differential identities on prime rings with involution
    Mamouni, A.
    Nejjar, B.
    Oukhtite, L.
    JOURNAL OF ALGEBRA AND ITS APPLICATIONS, 2018, 17 (09)
  • [50] Weak Jordan *-derivations of prime rings
    Siddeeque, Mohammad Aslam
    Khan, Nazim
    Abdullah, Ali Ahmed
    JOURNAL OF ALGEBRA AND ITS APPLICATIONS, 2023, 22 (05)
12345